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pacman::p_load(olsrr, corrplot, ggpubr, sf, spdep, GWmodel, tmap, tidyverse, gtsummary)This is an in-class exercise that is an extension of Hands-on Exercise 4 based on Chapter 6 of R for Geospatial Data Science and Analytics by Dr. Kam Tin Seong and is a requirement under the class ISS624: Geospatial Analytics and Applications.
Here we go over some changes from the original hands-on exercise, fix some errors and add some notes on discussion.
How are prices determined? Hedonic pricing is a model that identifies price factors according to the premise that price is determined both by internal characteristics of the good being sold and external factors affecting it. This is often used in the field of real estate to estimate property values. In this exercise, we determine to what extent certain structural and locational variables affected the resale prices of condominiums in 2015.
Geographically weighted regression (GWR) is a spatial statistical technique that takes non-stationary variables into consideration (e.g., climate; demographic factors; physical environment characteristics) and models the local relationships between these independent variables and an outcome of interest (also known as dependent variable). In this exercise, we use GWR methods to build hedonic pricing models.
The code chunk loads the necessary packages for the exercise.
NEW PACKAGES UNLOCKED: olsrr, GWmodel, gtsummary
The geospatial data used in this hands-on exercise is called ‘MP14_SUBZONE_WEB_PL’ which is in ESRI shapefile format. It defines the URA Master Plan 2014’s planning subzone boundaries. Polygon features are used to represent these geographic boundaries. The GIS data is in the ‘SVY21’ projected coordinates system.
The code chunk below is used to import ’MP_SUBZONE_WEB_PL’ shapefile by using st_read() of sf packages.
Reading layer `MP14_SUBZONE_WEB_PL' from data source
`C:\acapgalano\ISSS624\In-class_Ex\In-class_Ex4\data\geospatial'
using driver `ESRI Shapefile'
Simple feature collection with 323 features and 15 fields
Geometry type: MULTIPOLYGON
Dimension: XY
Bounding box: xmin: 2667.538 ymin: 15748.72 xmax: 56396.44 ymax: 50256.33
Projected CRS: SVY21
Since the simple feature object ‘mpsz’ does not have EPSG information, the code chunk below updates the newly imported ’mpsz’ with the correct ESPG code (i.e. 3414).
The code chunk below uses st_crs() to verify the newly transformed ’mpsz_svy21’ has EPSG set to 3414.
Coordinate Reference System:
User input: EPSG:3414
wkt:
PROJCRS["SVY21 / Singapore TM",
BASEGEOGCRS["SVY21",
DATUM["SVY21",
ELLIPSOID["WGS 84",6378137,298.257223563,
LENGTHUNIT["metre",1]]],
PRIMEM["Greenwich",0,
ANGLEUNIT["degree",0.0174532925199433]],
ID["EPSG",4757]],
CONVERSION["Singapore Transverse Mercator",
METHOD["Transverse Mercator",
ID["EPSG",9807]],
PARAMETER["Latitude of natural origin",1.36666666666667,
ANGLEUNIT["degree",0.0174532925199433],
ID["EPSG",8801]],
PARAMETER["Longitude of natural origin",103.833333333333,
ANGLEUNIT["degree",0.0174532925199433],
ID["EPSG",8802]],
PARAMETER["Scale factor at natural origin",1,
SCALEUNIT["unity",1],
ID["EPSG",8805]],
PARAMETER["False easting",28001.642,
LENGTHUNIT["metre",1],
ID["EPSG",8806]],
PARAMETER["False northing",38744.572,
LENGTHUNIT["metre",1],
ID["EPSG",8807]]],
CS[Cartesian,2],
AXIS["northing (N)",north,
ORDER[1],
LENGTHUNIT["metre",1]],
AXIS["easting (E)",east,
ORDER[2],
LENGTHUNIT["metre",1]],
USAGE[
SCOPE["Cadastre, engineering survey, topographic mapping."],
AREA["Singapore - onshore and offshore."],
BBOX[1.13,103.59,1.47,104.07]],
ID["EPSG",3414]]
Next, we see the extent of ’mpsz_svy21’ using the st_bbox() of sf package.
The ‘condo_resale_2015’ is in csv file format. The codes chunk below uses read_csv() function of readr package to import’condo_resale_2015’ into R as a tibble data frame called ’condo_resale’.
The code chunk below uses glimpse() to view the data structure of the columns.
Rows: 1,436
Columns: 23
$ LATITUDE <dbl> 1.287145, 1.328698, 1.313727, 1.308563, 1.321437,…
$ LONGITUDE <dbl> 103.7802, 103.8123, 103.7971, 103.8247, 103.9505,…
$ POSTCODE <dbl> 118635, 288420, 267833, 258380, 467169, 466472, 3…
$ SELLING_PRICE <dbl> 3000000, 3880000, 3325000, 4250000, 1400000, 1320…
$ AREA_SQM <dbl> 309, 290, 248, 127, 145, 139, 218, 141, 165, 168,…
$ AGE <dbl> 30, 32, 33, 7, 28, 22, 24, 24, 27, 31, 17, 22, 6,…
$ PROX_CBD <dbl> 7.941259, 6.609797, 6.898000, 4.038861, 11.783402…
$ PROX_CHILDCARE <dbl> 0.16597932, 0.28027246, 0.42922669, 0.39473543, 0…
$ PROX_ELDERLYCARE <dbl> 2.5198118, 1.9333338, 0.5021395, 1.9910316, 1.121…
$ PROX_URA_GROWTH_AREA <dbl> 6.618741, 7.505109, 6.463887, 4.906512, 6.410632,…
$ PROX_HAWKER_MARKET <dbl> 1.76542207, 0.54507614, 0.37789301, 1.68259969, 0…
$ PROX_KINDERGARTEN <dbl> 0.05835552, 0.61592412, 0.14120309, 0.38200076, 0…
$ PROX_MRT <dbl> 0.5607188, 0.6584461, 0.3053433, 0.6910183, 0.528…
$ PROX_PARK <dbl> 1.1710446, 0.1992269, 0.2779886, 0.9832843, 0.116…
$ PROX_PRIMARY_SCH <dbl> 1.6340256, 0.9747834, 1.4715016, 1.4546324, 0.709…
$ PROX_TOP_PRIMARY_SCH <dbl> 3.3273195, 0.9747834, 1.4715016, 2.3006394, 0.709…
$ PROX_SHOPPING_MALL <dbl> 2.2102717, 2.9374279, 1.2256850, 0.3525671, 1.307…
$ PROX_SUPERMARKET <dbl> 0.9103958, 0.5900617, 0.4135583, 0.4162219, 0.581…
$ PROX_BUS_STOP <dbl> 0.10336166, 0.28673408, 0.28504777, 0.29872340, 0…
$ NO_Of_UNITS <dbl> 18, 20, 27, 30, 30, 31, 32, 32, 32, 32, 34, 34, 3…
$ FAMILY_FRIENDLY <dbl> 0, 0, 0, 0, 0, 1, 1, 0, 1, 1, 0, 0, 0, 0, 0, 0, 0…
$ FREEHOLD <dbl> 1, 1, 1, 1, 1, 1, 1, 1, 1, 0, 1, 1, 1, 1, 1, 1, 1…
$ LEASEHOLD_99YR <dbl> 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0…
The code chunk below looks at the data in the 'XCOORD' column.
[1] 103.7802 103.8123 103.7971 103.8247 103.9505 103.9386
The code chunk below looks at the data in the 'YCOORD' column.
[1] 1.287145 1.328698 1.313727 1.308563 1.321437 1.314198
Next, the function summary() is used to display the summary statistics of ’cond_resale’ tibble data frame.
LATITUDE LONGITUDE POSTCODE SELLING_PRICE
Min. :1.240 Min. :103.7 Min. : 18965 Min. : 540000
1st Qu.:1.309 1st Qu.:103.8 1st Qu.:259849 1st Qu.: 1100000
Median :1.328 Median :103.8 Median :469298 Median : 1383222
Mean :1.334 Mean :103.8 Mean :440439 Mean : 1751211
3rd Qu.:1.357 3rd Qu.:103.9 3rd Qu.:589486 3rd Qu.: 1950000
Max. :1.454 Max. :104.0 Max. :828833 Max. :18000000
AREA_SQM AGE PROX_CBD PROX_CHILDCARE
Min. : 34.0 Min. : 0.00 Min. : 0.3869 Min. :0.004927
1st Qu.:103.0 1st Qu.: 5.00 1st Qu.: 5.5574 1st Qu.:0.174481
Median :121.0 Median :11.00 Median : 9.3567 Median :0.258135
Mean :136.5 Mean :12.14 Mean : 9.3254 Mean :0.326313
3rd Qu.:156.0 3rd Qu.:18.00 3rd Qu.:12.6661 3rd Qu.:0.368293
Max. :619.0 Max. :37.00 Max. :19.1804 Max. :3.465726
PROX_ELDERLYCARE PROX_URA_GROWTH_AREA PROX_HAWKER_MARKET PROX_KINDERGARTEN
Min. :0.05451 Min. :0.2145 Min. :0.05182 Min. :0.004927
1st Qu.:0.61254 1st Qu.:3.1643 1st Qu.:0.55245 1st Qu.:0.276345
Median :0.94179 Median :4.6186 Median :0.90842 Median :0.413385
Mean :1.05351 Mean :4.5981 Mean :1.27987 Mean :0.458903
3rd Qu.:1.35122 3rd Qu.:5.7550 3rd Qu.:1.68578 3rd Qu.:0.578474
Max. :3.94916 Max. :9.1554 Max. :5.37435 Max. :2.229045
PROX_MRT PROX_PARK PROX_PRIMARY_SCH PROX_TOP_PRIMARY_SCH
Min. :0.05278 Min. :0.02906 Min. :0.07711 Min. :0.07711
1st Qu.:0.34646 1st Qu.:0.26211 1st Qu.:0.44024 1st Qu.:1.34451
Median :0.57430 Median :0.39926 Median :0.63505 Median :1.88213
Mean :0.67316 Mean :0.49802 Mean :0.75471 Mean :2.27347
3rd Qu.:0.84844 3rd Qu.:0.65592 3rd Qu.:0.95104 3rd Qu.:2.90954
Max. :3.48037 Max. :2.16105 Max. :3.92899 Max. :6.74819
PROX_SHOPPING_MALL PROX_SUPERMARKET PROX_BUS_STOP NO_Of_UNITS
Min. :0.0000 Min. :0.0000 Min. :0.001595 Min. : 18.0
1st Qu.:0.5258 1st Qu.:0.3695 1st Qu.:0.098356 1st Qu.: 188.8
Median :0.9357 Median :0.5687 Median :0.151710 Median : 360.0
Mean :1.0455 Mean :0.6141 Mean :0.193974 Mean : 409.2
3rd Qu.:1.3994 3rd Qu.:0.7862 3rd Qu.:0.220466 3rd Qu.: 590.0
Max. :3.4774 Max. :2.2441 Max. :2.476639 Max. :1703.0
FAMILY_FRIENDLY FREEHOLD LEASEHOLD_99YR
Min. :0.0000 Min. :0.0000 Min. :0.0000
1st Qu.:0.0000 1st Qu.:0.0000 1st Qu.:0.0000
Median :0.0000 Median :0.0000 Median :0.0000
Mean :0.4868 Mean :0.4227 Mean :0.4882
3rd Qu.:1.0000 3rd Qu.:1.0000 3rd Qu.:1.0000
Max. :1.0000 Max. :1.0000 Max. :1.0000
The code chunk below uses the function st_as_sf() to convert our tibble data frame to a simple feature data frame. We also use st_transform() once again to convert the coordinates WGS84 to SVY21 (which is the projected CRS of our geospatial data).
Simple feature collection with 6 features and 21 fields
Geometry type: POINT
Dimension: XY
Bounding box: xmin: 22085.12 ymin: 29951.54 xmax: 41042.56 ymax: 34546.2
Projected CRS: SVY21 / Singapore TM
# A tibble: 6 × 22
POSTCODE SELLI…¹ AREA_…² AGE PROX_…³ PROX_…⁴ PROX_…⁵ PROX_…⁶ PROX_…⁷ PROX_…⁸
<dbl> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl>
1 118635 3000000 309 30 7.94 0.166 2.52 6.62 1.77 0.0584
2 288420 3880000 290 32 6.61 0.280 1.93 7.51 0.545 0.616
3 267833 3325000 248 33 6.90 0.429 0.502 6.46 0.378 0.141
4 258380 4250000 127 7 4.04 0.395 1.99 4.91 1.68 0.382
5 467169 1400000 145 28 11.8 0.119 1.12 6.41 0.565 0.461
6 466472 1320000 139 22 10.3 0.125 0.789 5.09 0.781 0.0994
# … with 12 more variables: PROX_MRT <dbl>, PROX_PARK <dbl>,
# PROX_PRIMARY_SCH <dbl>, PROX_TOP_PRIMARY_SCH <dbl>,
# PROX_SHOPPING_MALL <dbl>, PROX_SUPERMARKET <dbl>, PROX_BUS_STOP <dbl>,
# NO_Of_UNITS <dbl>, FAMILY_FRIENDLY <dbl>, FREEHOLD <dbl>,
# LEASEHOLD_99YR <dbl>, geometry <POINT [m]>, and abbreviated variable names
# ¹SELLING_PRICE, ²AREA_SQM, ³PROX_CBD, ⁴PROX_CHILDCARE, ⁵PROX_ELDERLYCARE,
# ⁶PROX_URA_GROWTH_AREA, ⁷PROX_HAWKER_MARKET, ⁸PROX_KINDERGARTEN
We now have a POINT feature data frame!

The figure above reveals a right skewed distribution. This means that more condominium units were transacted at relative lower prices.
Since distribution for 'SELLING_PRICE' is skewed, we need to normalize it. In this case we use log transformation. The code chunk below uses mutate() to apply the log() function to the 'SELLING_PRICE' column.

Visually, we can clearly see the distribution has moved towards the center and is closer to looking like a normal distribution.
AREA_SQM <- ggplot(data=condo_resale.sf, aes(x= `AREA_SQM`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
AGE <- ggplot(data=condo_resale.sf, aes(x= `AGE`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_CBD <- ggplot(data=condo_resale.sf, aes(x= `PROX_CBD`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_CHILDCARE <- ggplot(data=condo_resale.sf, aes(x= `PROX_CHILDCARE`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_ELDERLYCARE <- ggplot(data=condo_resale.sf, aes(x= `PROX_ELDERLYCARE`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_URA_GROWTH_AREA <- ggplot(data=condo_resale.sf,
aes(x= `PROX_URA_GROWTH_AREA`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_HAWKER_MARKET <- ggplot(data=condo_resale.sf, aes(x= `PROX_HAWKER_MARKET`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_KINDERGARTEN <- ggplot(data=condo_resale.sf, aes(x= `PROX_KINDERGARTEN`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_MRT <- ggplot(data=condo_resale.sf, aes(x= `PROX_MRT`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_PARK <- ggplot(data=condo_resale.sf, aes(x= `PROX_PARK`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_PRIMARY_SCH <- ggplot(data=condo_resale.sf, aes(x= `PROX_PRIMARY_SCH`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_TOP_PRIMARY_SCH <- ggplot(data=condo_resale.sf,
aes(x= `PROX_TOP_PRIMARY_SCH`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
ggarrange(AREA_SQM, AGE, PROX_CBD, PROX_CHILDCARE, PROX_ELDERLYCARE,
PROX_URA_GROWTH_AREA, PROX_HAWKER_MARKET, PROX_KINDERGARTEN, PROX_MRT,
PROX_PARK, PROX_PRIMARY_SCH, PROX_TOP_PRIMARY_SCH,
ncol = 3, nrow = 4)
Lastly, we want to reveal the geospatial distribution condominium resale prices in Singapore. The map will be prepared using the tmap package.
First, we will turn on the interactive mode of tmap by setting tmap_mode() to “view”.
Next, the code chunks below is used to create an interactive point symbol map.
The dots shown in the map above represent the condos.
You may encounter an error telling you that the shape includes invalid polygons. Unfortunately, the reality is even if the these files are taken from official sources, there may still be some errors. One such error is out of place tiny polygons in the center. You may not see it but if you check the code, you’ll see it as data. The easiest fix for this is to run tmap_options(check.and.fix = TRUE).
Now we need to set tmap_mode() back to “plot” for future use.
First, we build a simple linear regression model by using 'SELLING_PRICE' as the dependent variable and 'AREA_SQM' as the independent variable. The code chunk below uses lm() to fit the linear model.
The code chunk below uses summary() to view information on the model.
Call:
lm(formula = SELLING_PRICE ~ AREA_SQM, data = condo_resale.sf)
Residuals:
Min 1Q Median 3Q Max
-3695815 -391764 -87517 258900 13503875
Coefficients:
Estimate Std. Error t value Pr(>|t|)
(Intercept) -258121.1 63517.2 -4.064 5.09e-05 ***
AREA_SQM 14719.0 428.1 34.381 < 2e-16 ***
---
Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
Residual standard error: 942700 on 1434 degrees of freedom
Multiple R-squared: 0.4518, Adjusted R-squared: 0.4515
F-statistic: 1182 on 1 and 1434 DF, p-value: < 2.2e-16
The output report reveals that the 'SELLING_PRICE' can be explained by using the formula:
\[ y = -258131.1 + 14719x_1\]
The \(R^2\) of 0.4518 reveals that the simple regression model built is able to explain about 45% of the resale prices.
Since p-value is much smaller than 0.0001, we will reject the null hypothesis that mean is a good estimator of 'SELLING_PRICE'. This will allow us to infer that simple linear regression model above is a good estimator of 'SELLING_PRICE'.
To visualize the best fit curve on a scatterplot, we can incorporate lm() as a method function in ggplot’s geometry as shown in the code chunk below.

The figure above reveals that there are a few statistical outliers with relatively high selling prices.
Before building a multiple regression model, it is important to ensure that the indepdent variables used are not highly correlated to each other.
Correlation matrix is commonly used to visualize the relationships between the independent variables. Beside the pairs() of R, there are many packages support the display of a correlation matrix. In this section, the corrplot package will be used.
The code chunk below is used to plot a scatterplot matrix of the relationship between the independent variables in ’condo_resale’ data frame.

If you squint, you’ll realize that we use the tibble 'condo_resale' for the cor() function. We didn’t use 'condo_resale.sf' we made because we need to use non-geospatial data, without the hidden geometry column.
Matrix reorder is very important for mining the hidden structure and patterns in the matrix. There are four methods in corrplot(parameter order), named “AOE”, “FPC”, “hclust”, “alphabet”). In the code chunk above, AOE order is used. It orders the variables by using the angular order of the eigenvectors method suggested by Michael Friendly.
From the scatterplot matrix, it is clear that ‘Freehold’ is highly correlated to ’LEASE_99YEAR’. In line with this, it is wiser to only include either one of them in the subsequent model building. As a result, ‘LEASE_99YEAR’ is excluded in the subsequent model building.
condo.mlr <- lm(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD + PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_HAWKER_MARKET +
PROX_KINDERGARTEN +
PROX_MRT + PROX_PARK +
PROX_PRIMARY_SCH +
PROX_TOP_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_SUPERMARKET +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data=condo_resale.sf)
summary(condo.mlr)
Call:
lm(formula = SELLING_PRICE ~ AREA_SQM + AGE + PROX_CBD + PROX_CHILDCARE +
PROX_ELDERLYCARE + PROX_URA_GROWTH_AREA + PROX_HAWKER_MARKET +
PROX_KINDERGARTEN + PROX_MRT + PROX_PARK + PROX_PRIMARY_SCH +
PROX_TOP_PRIMARY_SCH + PROX_SHOPPING_MALL + PROX_SUPERMARKET +
PROX_BUS_STOP + NO_Of_UNITS + FAMILY_FRIENDLY + FREEHOLD,
data = condo_resale.sf)
Residuals:
Min 1Q Median 3Q Max
-3475964 -293923 -23069 241043 12260381
Coefficients:
Estimate Std. Error t value Pr(>|t|)
(Intercept) 481728.40 121441.01 3.967 7.65e-05 ***
AREA_SQM 12708.32 369.59 34.385 < 2e-16 ***
AGE -24440.82 2763.16 -8.845 < 2e-16 ***
PROX_CBD -78669.78 6768.97 -11.622 < 2e-16 ***
PROX_CHILDCARE -351617.91 109467.25 -3.212 0.00135 **
PROX_ELDERLYCARE 171029.42 42110.51 4.061 5.14e-05 ***
PROX_URA_GROWTH_AREA 38474.53 12523.57 3.072 0.00217 **
PROX_HAWKER_MARKET 23746.10 29299.76 0.810 0.41782
PROX_KINDERGARTEN 147468.99 82668.87 1.784 0.07466 .
PROX_MRT -314599.68 57947.44 -5.429 6.66e-08 ***
PROX_PARK 563280.50 66551.68 8.464 < 2e-16 ***
PROX_PRIMARY_SCH 180186.08 65237.95 2.762 0.00582 **
PROX_TOP_PRIMARY_SCH 2280.04 20410.43 0.112 0.91107
PROX_SHOPPING_MALL -206604.06 42840.60 -4.823 1.57e-06 ***
PROX_SUPERMARKET -44991.80 77082.64 -0.584 0.55953
PROX_BUS_STOP 683121.35 138353.28 4.938 8.85e-07 ***
NO_Of_UNITS -231.18 89.03 -2.597 0.00951 **
FAMILY_FRIENDLY 140340.77 47020.55 2.985 0.00289 **
FREEHOLD 359913.01 49220.22 7.312 4.38e-13 ***
---
Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
Residual standard error: 755800 on 1417 degrees of freedom
Multiple R-squared: 0.6518, Adjusted R-squared: 0.6474
F-statistic: 147.4 on 18 and 1417 DF, p-value: < 2.2e-16
With reference to the report above, it is clear that not all the independent variables are statistically significant. We will revised the model by removing those variables which are not statistically significant.
The code chunk below uses ols_regress() to create a more visually appealing and readable summary of the model.
Model Summary
------------------------------------------------------------------------
R 0.807 RMSE 755957.289
R-Squared 0.651 Coef. Var 43.168
Adj. R-Squared 0.647 MSE 571471422208.591
Pred R-Squared 0.638 MAE 414819.628
------------------------------------------------------------------------
RMSE: Root Mean Square Error
MSE: Mean Square Error
MAE: Mean Absolute Error
ANOVA
--------------------------------------------------------------------------------
Sum of
Squares DF Mean Square F Sig.
--------------------------------------------------------------------------------
Regression 1.512586e+15 14 1.080418e+14 189.059 0.0000
Residual 8.120609e+14 1421 571471422208.591
Total 2.324647e+15 1435
--------------------------------------------------------------------------------
Parameter Estimates
-----------------------------------------------------------------------------------------------------------------
model Beta Std. Error Std. Beta t Sig lower upper
-----------------------------------------------------------------------------------------------------------------
(Intercept) 527633.222 108183.223 4.877 0.000 315417.244 739849.200
AREA_SQM 12777.523 367.479 0.584 34.771 0.000 12056.663 13498.382
AGE -24687.739 2754.845 -0.167 -8.962 0.000 -30091.739 -19283.740
PROX_CBD -77131.323 5763.125 -0.263 -13.384 0.000 -88436.469 -65826.176
PROX_CHILDCARE -318472.751 107959.512 -0.084 -2.950 0.003 -530249.889 -106695.613
PROX_ELDERLYCARE 185575.623 39901.864 0.090 4.651 0.000 107302.737 263848.510
PROX_URA_GROWTH_AREA 39163.254 11754.829 0.060 3.332 0.001 16104.571 62221.936
PROX_MRT -294745.107 56916.367 -0.112 -5.179 0.000 -406394.234 -183095.980
PROX_PARK 570504.807 65507.029 0.150 8.709 0.000 442003.938 699005.677
PROX_PRIMARY_SCH 159856.136 60234.599 0.062 2.654 0.008 41697.849 278014.424
PROX_SHOPPING_MALL -220947.251 36561.832 -0.115 -6.043 0.000 -292668.213 -149226.288
PROX_BUS_STOP 682482.221 134513.243 0.134 5.074 0.000 418616.359 946348.082
NO_Of_UNITS -245.480 87.947 -0.053 -2.791 0.005 -418.000 -72.961
FAMILY_FRIENDLY 146307.576 46893.021 0.057 3.120 0.002 54320.593 238294.560
FREEHOLD 350599.812 48506.485 0.136 7.228 0.000 255447.802 445751.821
-----------------------------------------------------------------------------------------------------------------
The adjusted \(R^2\) is 0.647.
The code chunk below uses tbl_regression() to create a well formatted regression report.
| Characteristic | Beta | 95% CI1 | p-value |
|---|---|---|---|
| (Intercept) | 527,633 | 315,417, 739,849 | <0.001 |
| AREA_SQM | 12,778 | 12,057, 13,498 | <0.001 |
| AGE | -24,688 | -30,092, -19,284 | <0.001 |
| PROX_CBD | -77,131 | -88,436, -65,826 | <0.001 |
| PROX_CHILDCARE | -318,473 | -530,250, -106,696 | 0.003 |
| PROX_ELDERLYCARE | 185,576 | 107,303, 263,849 | <0.001 |
| PROX_URA_GROWTH_AREA | 39,163 | 16,105, 62,222 | <0.001 |
| PROX_MRT | -294,745 | -406,394, -183,096 | <0.001 |
| PROX_PARK | 570,505 | 442,004, 699,006 | <0.001 |
| PROX_PRIMARY_SCH | 159,856 | 41,698, 278,014 | 0.008 |
| PROX_SHOPPING_MALL | -220,947 | -292,668, -149,226 | <0.001 |
| PROX_BUS_STOP | 682,482 | 418,616, 946,348 | <0.001 |
| NO_Of_UNITS | -245 | -418, -73 | 0.005 |
| FAMILY_FRIENDLY | 146,308 | 54,321, 238,295 | 0.002 |
| FREEHOLD | 350,600 | 255,448, 445,752 | <0.001 |
| R² = 0.651; Adjusted R² = 0.647; AIC = 42,967; Statistic = 189; p-value = <0.001; σ = 755,957 | |||
| 1 CI = Confidence Interval | |||
Every unit of the characteristic increases or decreases by the ‘Beta’. For example, whether the property is freehold or not increases the resale price by SGD 350,000.
In the code chunk below, the ols_vif_tol() of olsrr package is used to test if there are sign of multicollinearity.
Variables Tolerance VIF
1 AREA_SQM 0.8728554 1.145665
2 AGE 0.7071275 1.414172
3 PROX_CBD 0.6356147 1.573280
4 PROX_CHILDCARE 0.3066019 3.261559
5 PROX_ELDERLYCARE 0.6598479 1.515501
6 PROX_URA_GROWTH_AREA 0.7510311 1.331503
7 PROX_MRT 0.5236090 1.909822
8 PROX_PARK 0.8279261 1.207837
9 PROX_PRIMARY_SCH 0.4524628 2.210126
10 PROX_SHOPPING_MALL 0.6738795 1.483945
11 PROX_BUS_STOP 0.3514118 2.845664
12 NO_Of_UNITS 0.6901036 1.449058
13 FAMILY_FRIENDLY 0.7244157 1.380423
14 FREEHOLD 0.6931163 1.442759
Since the VIF of the independent variables are less than 10. We can safely conclude that there are no sign of multicollinearity among the independent variables.
In the code chunk below, the ols_plot_resid_fit() of olsrr package is used to perform linearity assumption test.
The figure above reveals that most of the data points are scattered around the 0 line, hence we can safely conclude that the relationships between the dependent variable and independent variables are linear.
Lastly, the code chunk below uses ols_plot_resid_hist() of olsrr package to perform normality assumption test.
The figure reveals that the residual of the multiple linear regression model (i.e. condo.mlr1) is resemble normal distribution.
If you prefer formal statistical test methods, the ols_test_normality() of olsrr package can be used as shown in the code chunk below.
-----------------------------------------------
Test Statistic pvalue
-----------------------------------------------
Shapiro-Wilk 0.6856 0.0000
Kolmogorov-Smirnov 0.1366 0.0000
Cramer-von Mises 121.0768 0.0000
Anderson-Darling 67.9551 0.0000
-----------------------------------------------
The summary table above reveals that the p-values of the four tests are way smaller than the alpha value of 0.05. Hence we will reject the null hypothesis and infer that there is statistical evidence that the residuals are not normally distributed.
The hedonic model is using geographically referenced attributes, hence it is also important for us to visual the residual of the hedonic pricing model.
In order to perform spatial autocorrelation test, we need to convert ‘’condo_resale.sf’ from a simple features data frame to a SpatialPointsDataFrame.
First, we will export the residual of the hedonic pricing model and save it as a data frame and join the newly created data frame with the ‘condo_resales.sf’ object.
Next, we will convert ‘condo_resale.res.sf’ from a simple feature object into a SpatialPointsDataFrame because spdep package can only process sp conformed spatial data objects.
class : SpatialPointsDataFrame
features : 1436
extent : 14940.85, 43352.45, 24765.67, 48382.81 (xmin, xmax, ymin, ymax)
crs : +proj=tmerc +lat_0=1.36666666666667 +lon_0=103.833333333333 +k=1 +x_0=28001.642 +y_0=38744.572 +ellps=WGS84 +towgs84=0,0,0,0,0,0,0 +units=m +no_defs
variables : 23
names : POSTCODE, SELLING_PRICE, AREA_SQM, AGE, PROX_CBD, PROX_CHILDCARE, PROX_ELDERLYCARE, PROX_URA_GROWTH_AREA, PROX_HAWKER_MARKET, PROX_KINDERGARTEN, PROX_MRT, PROX_PARK, PROX_PRIMARY_SCH, PROX_TOP_PRIMARY_SCH, PROX_SHOPPING_MALL, ...
min values : 18965, 540000, 34, 0, 0.386916393, 0.004927023, 0.054508623, 0.214539508, 0.051817113, 0.004927023, 0.052779424, 0.029064164, 0.077106132, 0.077106132, 0, ...
max values : 828833, 1.8e+07, 619, 37, 19.18042832, 3.46572633, 3.949157205, 9.15540001, 5.374348075, 2.229045366, 3.48037319, 2.16104919, 3.928989144, 6.748192062, 3.477433767, ...
Now we can view the residuals mapped using tmap .
The figure above reveals that there is sign of spatial autocorrelation.
To prove that our observation is indeed true, the Moran’s I test will be performed. To do that we need to create our distance-based weight matrix using dnearneigh().
Neighbour list object:
Number of regions: 1436
Number of nonzero links: 66266
Percentage nonzero weights: 3.213526
Average number of links: 46.14624
Link number distribution:
1 3 5 7 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24
3 3 9 4 3 15 10 19 17 45 19 5 14 29 19 6 35 45 18 47
25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44
16 43 22 26 21 11 9 23 22 13 16 25 21 37 16 18 8 21 4 12
45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64
8 36 18 14 14 43 11 12 8 13 12 13 4 5 6 12 11 20 29 33
65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84
15 20 10 14 15 15 11 16 12 10 8 19 12 14 9 8 4 13 11 6
85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104
4 9 4 4 4 6 2 16 9 4 5 9 3 9 4 2 1 2 1 1
105 106 107 108 109 110 112 116 125
1 5 9 2 1 3 1 1 1
3 least connected regions:
193 194 277 with 1 link
1 most connected region:
285 with 125 links
Next, nb2listw() will be used to convert the output neighbours lists into a spatial weights.
Characteristics of weights list object:
Neighbour list object:
Number of regions: 1436
Number of nonzero links: 66266
Percentage nonzero weights: 3.213526
Average number of links: 46.14624
Link number distribution:
1 3 5 7 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24
3 3 9 4 3 15 10 19 17 45 19 5 14 29 19 6 35 45 18 47
25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44
16 43 22 26 21 11 9 23 22 13 16 25 21 37 16 18 8 21 4 12
45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64
8 36 18 14 14 43 11 12 8 13 12 13 4 5 6 12 11 20 29 33
65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84
15 20 10 14 15 15 11 16 12 10 8 19 12 14 9 8 4 13 11 6
85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104
4 9 4 4 4 6 2 16 9 4 5 9 3 9 4 2 1 2 1 1
105 106 107 108 109 110 112 116 125
1 5 9 2 1 3 1 1 1
3 least connected regions:
193 194 277 with 1 link
1 most connected region:
285 with 125 links
Weights style: W
Weights constants summary:
n nn S0 S1 S2
W 1436 2062096 1436 94.81916 5798.341
Finally we do the Moran’s I test using lm.morantest() for residual spatial autocorrelation.
Global Moran I for regression residuals
data:
model: lm(formula = SELLING_PRICE ~ AREA_SQM + AGE + PROX_CBD +
PROX_CHILDCARE + PROX_ELDERLYCARE + PROX_URA_GROWTH_AREA + PROX_MRT +
PROX_PARK + PROX_PRIMARY_SCH + PROX_SHOPPING_MALL + PROX_BUS_STOP +
NO_Of_UNITS + FAMILY_FRIENDLY + FREEHOLD, data = condo_resale.sf)
weights: nb_lw
Moran I statistic standard deviate = 24.366, p-value < 2.2e-16
alternative hypothesis: greater
sample estimates:
Observed Moran I Expectation Variance
1.438876e-01 -5.487594e-03 3.758259e-05
The Global Moran’s I test for residual spatial autocorrelation shows that it’s p-value is less than 0.00000000000000022 which is less than the alpha value of 0.05. Hence, we will reject the null hypothesis that the residuals are randomly distributed.
Since the Observed Global Moran I = 0.1424418 which is greater than 0, we can infer than the residuals resemble cluster distribution.
bw.fixed <- bw.gwr(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD +
PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_MRT +
PROX_PARK +
PROX_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data = condo_resale.sp,
approach = "CV",
kernel = "gaussian",
adaptive = FALSE,
longlat = FALSE)Fixed bandwidth: 17660.96 CV score: 8.259118e+14
Fixed bandwidth: 10917.26 CV score: 7.970454e+14
Fixed bandwidth: 6749.419 CV score: 7.273273e+14
Fixed bandwidth: 4173.553 CV score: 6.300006e+14
Fixed bandwidth: 2581.58 CV score: 5.404958e+14
Fixed bandwidth: 1597.687 CV score: 4.857515e+14
Fixed bandwidth: 989.6077 CV score: 4.722431e+14
Fixed bandwidth: 613.7939 CV score: 1.378294e+16
Fixed bandwidth: 1221.873 CV score: 4.778717e+14
Fixed bandwidth: 846.0596 CV score: 4.791629e+14
Fixed bandwidth: 1078.325 CV score: 4.751406e+14
Fixed bandwidth: 934.7772 CV score: 4.72518e+14
Fixed bandwidth: 1023.495 CV score: 4.730305e+14
Fixed bandwidth: 968.6643 CV score: 4.721317e+14
Fixed bandwidth: 955.7206 CV score: 4.722072e+14
Fixed bandwidth: 976.6639 CV score: 4.721387e+14
Fixed bandwidth: 963.7202 CV score: 4.721484e+14
Fixed bandwidth: 971.7199 CV score: 4.721293e+14
Fixed bandwidth: 973.6083 CV score: 4.721309e+14
Fixed bandwidth: 970.5527 CV score: 4.721295e+14
Fixed bandwidth: 972.4412 CV score: 4.721296e+14
Fixed bandwidth: 971.2741 CV score: 4.721292e+14
Fixed bandwidth: 970.9985 CV score: 4.721293e+14
Fixed bandwidth: 971.4443 CV score: 4.721292e+14
Fixed bandwidth: 971.5496 CV score: 4.721293e+14
Fixed bandwidth: 971.3793 CV score: 4.721292e+14
Fixed bandwidth: 971.3391 CV score: 4.721292e+14
Fixed bandwidth: 971.3143 CV score: 4.721292e+14
Fixed bandwidth: 971.3545 CV score: 4.721292e+14
Fixed bandwidth: 971.3296 CV score: 4.721292e+14
Fixed bandwidth: 971.345 CV score: 4.721292e+14
Fixed bandwidth: 971.3355 CV score: 4.721292e+14
Fixed bandwidth: 971.3413 CV score: 4.721292e+14
Fixed bandwidth: 971.3377 CV score: 4.721292e+14
Fixed bandwidth: 971.34 CV score: 4.721292e+14
Fixed bandwidth: 971.3405 CV score: 4.721292e+14
Fixed bandwidth: 971.3408 CV score: 4.721292e+14
Fixed bandwidth: 971.3403 CV score: 4.721292e+14
Fixed bandwidth: 971.3406 CV score: 4.721292e+14
Fixed bandwidth: 971.3404 CV score: 4.721292e+14
Fixed bandwidth: 971.3405 CV score: 4.721292e+14
Fixed bandwidth: 971.3405 CV score: 4.721292e+14
The result shows that the recommended bandwidth is 971.3405 meters. We use meters because that is the unit of measurement of our projected coordinate system.
gwr.fixed <- gwr.basic(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD +
PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_MRT +
PROX_PARK +
PROX_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data=condo_resale.sp,
bw=bw.fixed,
kernel = 'gaussian',
longlat = FALSE)The output is saved in a list of class “gwrm”. The code below can be used to display the model output.
***********************************************************************
* Package GWmodel *
***********************************************************************
Program starts at: 2022-12-15 23:55:51
Call:
gwr.basic(formula = SELLING_PRICE ~ AREA_SQM + AGE + PROX_CBD +
PROX_CHILDCARE + PROX_ELDERLYCARE + PROX_URA_GROWTH_AREA +
PROX_MRT + PROX_PARK + PROX_PRIMARY_SCH + PROX_SHOPPING_MALL +
PROX_BUS_STOP + NO_Of_UNITS + FAMILY_FRIENDLY + FREEHOLD,
data = condo_resale.sp, bw = bw.fixed, kernel = "gaussian",
longlat = FALSE)
Dependent (y) variable: SELLING_PRICE
Independent variables: AREA_SQM AGE PROX_CBD PROX_CHILDCARE PROX_ELDERLYCARE PROX_URA_GROWTH_AREA PROX_MRT PROX_PARK PROX_PRIMARY_SCH PROX_SHOPPING_MALL PROX_BUS_STOP NO_Of_UNITS FAMILY_FRIENDLY FREEHOLD
Number of data points: 1436
***********************************************************************
* Results of Global Regression *
***********************************************************************
Call:
lm(formula = formula, data = data)
Residuals:
Min 1Q Median 3Q Max
-3470778 -298119 -23481 248917 12234210
Coefficients:
Estimate Std. Error t value Pr(>|t|)
(Intercept) 527633.22 108183.22 4.877 1.20e-06 ***
AREA_SQM 12777.52 367.48 34.771 < 2e-16 ***
AGE -24687.74 2754.84 -8.962 < 2e-16 ***
PROX_CBD -77131.32 5763.12 -13.384 < 2e-16 ***
PROX_CHILDCARE -318472.75 107959.51 -2.950 0.003231 **
PROX_ELDERLYCARE 185575.62 39901.86 4.651 3.61e-06 ***
PROX_URA_GROWTH_AREA 39163.25 11754.83 3.332 0.000885 ***
PROX_MRT -294745.11 56916.37 -5.179 2.56e-07 ***
PROX_PARK 570504.81 65507.03 8.709 < 2e-16 ***
PROX_PRIMARY_SCH 159856.14 60234.60 2.654 0.008046 **
PROX_SHOPPING_MALL -220947.25 36561.83 -6.043 1.93e-09 ***
PROX_BUS_STOP 682482.22 134513.24 5.074 4.42e-07 ***
NO_Of_UNITS -245.48 87.95 -2.791 0.005321 **
FAMILY_FRIENDLY 146307.58 46893.02 3.120 0.001845 **
FREEHOLD 350599.81 48506.48 7.228 7.98e-13 ***
---Significance stars
Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
Residual standard error: 756000 on 1421 degrees of freedom
Multiple R-squared: 0.6507
Adjusted R-squared: 0.6472
F-statistic: 189.1 on 14 and 1421 DF, p-value: < 2.2e-16
***Extra Diagnostic information
Residual sum of squares: 8.120609e+14
Sigma(hat): 752522.9
AIC: 42966.76
AICc: 42967.14
BIC: 41731.39
***********************************************************************
* Results of Geographically Weighted Regression *
***********************************************************************
*********************Model calibration information*********************
Kernel function: gaussian
Fixed bandwidth: 971.3405
Regression points: the same locations as observations are used.
Distance metric: Euclidean distance metric is used.
****************Summary of GWR coefficient estimates:******************
Min. 1st Qu. Median 3rd Qu.
Intercept -3.5988e+07 -5.1998e+05 7.6780e+05 1.7412e+06
AREA_SQM 1.0003e+03 5.2758e+03 7.4740e+03 1.2301e+04
AGE -1.3475e+05 -2.0813e+04 -8.6260e+03 -3.7784e+03
PROX_CBD -7.7047e+07 -2.3608e+05 -8.3600e+04 3.4646e+04
PROX_CHILDCARE -6.0097e+06 -3.3667e+05 -9.7425e+04 2.9007e+05
PROX_ELDERLYCARE -3.5000e+06 -1.5970e+05 3.1971e+04 1.9577e+05
PROX_URA_GROWTH_AREA -3.0170e+06 -8.2013e+04 7.0749e+04 2.2612e+05
PROX_MRT -3.5282e+06 -6.5836e+05 -1.8833e+05 3.6922e+04
PROX_PARK -1.2062e+06 -2.1732e+05 3.5383e+04 4.1335e+05
PROX_PRIMARY_SCH -2.2695e+07 -1.7066e+05 4.8472e+04 5.1555e+05
PROX_SHOPPING_MALL -7.2585e+06 -1.6684e+05 -1.0517e+04 1.5923e+05
PROX_BUS_STOP -1.4676e+06 -4.5207e+04 3.7601e+05 1.1664e+06
NO_Of_UNITS -1.3170e+03 -2.4822e+02 -3.0846e+01 2.5496e+02
FAMILY_FRIENDLY -2.2749e+06 -1.1140e+05 7.6214e+03 1.6107e+05
FREEHOLD -9.2067e+06 3.8073e+04 1.5169e+05 3.7528e+05
Max.
Intercept 112793548
AREA_SQM 21575
AGE 434201
PROX_CBD 2704596
PROX_CHILDCARE 1654087
PROX_ELDERLYCARE 38867814
PROX_URA_GROWTH_AREA 78515730
PROX_MRT 3124316
PROX_PARK 18122425
PROX_PRIMARY_SCH 4637503
PROX_SHOPPING_MALL 1529952
PROX_BUS_STOP 11342182
NO_Of_UNITS 12907
FAMILY_FRIENDLY 1720744
FREEHOLD 6073636
************************Diagnostic information*************************
Number of data points: 1436
Effective number of parameters (2trace(S) - trace(S'S)): 438.3804
Effective degrees of freedom (n-2trace(S) + trace(S'S)): 997.6196
AICc (GWR book, Fotheringham, et al. 2002, p. 61, eq 2.33): 42263.61
AIC (GWR book, Fotheringham, et al. 2002,GWR p. 96, eq. 4.22): 41632.36
BIC (GWR book, Fotheringham, et al. 2002,GWR p. 61, eq. 2.34): 42515.71
Residual sum of squares: 2.53407e+14
R-square value: 0.8909912
Adjusted R-square value: 0.8430417
***********************************************************************
Program stops at: 2022-12-15 23:55:52
The report shows that the adjusted \(R^2\) of the gwr is 0.8430 which is significantly better than the global multiple linear regression model of 0.6472. However, adjusted \(R^2\) is not measure we want to use to determine a good model. We want to look at the AICc value which is 42,263.61. It is significantly smaller than the global multiple linear regression model of 42967.1.
Similar to the earlier section, used bw.ger() to determine the recommended data point to use.
The code chunk below look very similar to the one used to compute the fixed bandwidth except the 'adaptive' argument has changed to “TRUE”.
bw.adaptive <- bw.gwr(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD +
PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_MRT + PROX_PARK +
PROX_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data=condo_resale.sp,
approach="CV",
kernel="gaussian",
adaptive=TRUE,
longlat=FALSE)Adaptive bandwidth: 895 CV score: 7.952401e+14
Adaptive bandwidth: 561 CV score: 7.667364e+14
Adaptive bandwidth: 354 CV score: 6.953454e+14
Adaptive bandwidth: 226 CV score: 6.15223e+14
Adaptive bandwidth: 147 CV score: 5.674373e+14
Adaptive bandwidth: 98 CV score: 5.426745e+14
Adaptive bandwidth: 68 CV score: 5.168117e+14
Adaptive bandwidth: 49 CV score: 4.859631e+14
Adaptive bandwidth: 37 CV score: 4.646518e+14
Adaptive bandwidth: 30 CV score: 4.422088e+14
Adaptive bandwidth: 25 CV score: 4.430816e+14
Adaptive bandwidth: 32 CV score: 4.505602e+14
Adaptive bandwidth: 27 CV score: 4.462172e+14
Adaptive bandwidth: 30 CV score: 4.422088e+14
The result shows that the 30 is the recommended data points to be used.
The code chunk below calibrates the gwr-based hedonic pricing model by using adaptive bandwidth and gaussian kernel.
gwr.adaptive <- gwr.basic(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD +
PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_MRT +
PROX_PARK +
PROX_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data=condo_resale.sp,
bw=bw.adaptive,
kernel = 'gaussian',
adaptive=TRUE,
longlat = FALSE)
gwr.adaptive ***********************************************************************
* Package GWmodel *
***********************************************************************
Program starts at: 2022-12-15 23:55:57
Call:
gwr.basic(formula = SELLING_PRICE ~ AREA_SQM + AGE + PROX_CBD +
PROX_CHILDCARE + PROX_ELDERLYCARE + PROX_URA_GROWTH_AREA +
PROX_MRT + PROX_PARK + PROX_PRIMARY_SCH + PROX_SHOPPING_MALL +
PROX_BUS_STOP + NO_Of_UNITS + FAMILY_FRIENDLY + FREEHOLD,
data = condo_resale.sp, bw = bw.adaptive, kernel = "gaussian",
adaptive = TRUE, longlat = FALSE)
Dependent (y) variable: SELLING_PRICE
Independent variables: AREA_SQM AGE PROX_CBD PROX_CHILDCARE PROX_ELDERLYCARE PROX_URA_GROWTH_AREA PROX_MRT PROX_PARK PROX_PRIMARY_SCH PROX_SHOPPING_MALL PROX_BUS_STOP NO_Of_UNITS FAMILY_FRIENDLY FREEHOLD
Number of data points: 1436
***********************************************************************
* Results of Global Regression *
***********************************************************************
Call:
lm(formula = formula, data = data)
Residuals:
Min 1Q Median 3Q Max
-3470778 -298119 -23481 248917 12234210
Coefficients:
Estimate Std. Error t value Pr(>|t|)
(Intercept) 527633.22 108183.22 4.877 1.20e-06 ***
AREA_SQM 12777.52 367.48 34.771 < 2e-16 ***
AGE -24687.74 2754.84 -8.962 < 2e-16 ***
PROX_CBD -77131.32 5763.12 -13.384 < 2e-16 ***
PROX_CHILDCARE -318472.75 107959.51 -2.950 0.003231 **
PROX_ELDERLYCARE 185575.62 39901.86 4.651 3.61e-06 ***
PROX_URA_GROWTH_AREA 39163.25 11754.83 3.332 0.000885 ***
PROX_MRT -294745.11 56916.37 -5.179 2.56e-07 ***
PROX_PARK 570504.81 65507.03 8.709 < 2e-16 ***
PROX_PRIMARY_SCH 159856.14 60234.60 2.654 0.008046 **
PROX_SHOPPING_MALL -220947.25 36561.83 -6.043 1.93e-09 ***
PROX_BUS_STOP 682482.22 134513.24 5.074 4.42e-07 ***
NO_Of_UNITS -245.48 87.95 -2.791 0.005321 **
FAMILY_FRIENDLY 146307.58 46893.02 3.120 0.001845 **
FREEHOLD 350599.81 48506.48 7.228 7.98e-13 ***
---Significance stars
Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
Residual standard error: 756000 on 1421 degrees of freedom
Multiple R-squared: 0.6507
Adjusted R-squared: 0.6472
F-statistic: 189.1 on 14 and 1421 DF, p-value: < 2.2e-16
***Extra Diagnostic information
Residual sum of squares: 8.120609e+14
Sigma(hat): 752522.9
AIC: 42966.76
AICc: 42967.14
BIC: 41731.39
***********************************************************************
* Results of Geographically Weighted Regression *
***********************************************************************
*********************Model calibration information*********************
Kernel function: gaussian
Adaptive bandwidth: 30 (number of nearest neighbours)
Regression points: the same locations as observations are used.
Distance metric: Euclidean distance metric is used.
****************Summary of GWR coefficient estimates:******************
Min. 1st Qu. Median 3rd Qu.
Intercept -1.3487e+08 -2.4669e+05 7.7928e+05 1.6194e+06
AREA_SQM 3.3188e+03 5.6285e+03 7.7825e+03 1.2738e+04
AGE -9.6746e+04 -2.9288e+04 -1.4043e+04 -5.6119e+03
PROX_CBD -2.5330e+06 -1.6256e+05 -7.7242e+04 2.6624e+03
PROX_CHILDCARE -1.2790e+06 -2.0175e+05 8.7158e+03 3.7778e+05
PROX_ELDERLYCARE -1.6212e+06 -9.2050e+04 6.1029e+04 2.8184e+05
PROX_URA_GROWTH_AREA -7.2686e+06 -3.0350e+04 4.5869e+04 2.4613e+05
PROX_MRT -4.3781e+07 -6.7282e+05 -2.2115e+05 -7.4593e+04
PROX_PARK -2.9020e+06 -1.6782e+05 1.1601e+05 4.6572e+05
PROX_PRIMARY_SCH -8.6418e+05 -1.6627e+05 -7.7853e+03 4.3222e+05
PROX_SHOPPING_MALL -1.8272e+06 -1.3175e+05 -1.4049e+04 1.3799e+05
PROX_BUS_STOP -2.0579e+06 -7.1461e+04 4.1104e+05 1.2071e+06
NO_Of_UNITS -2.1993e+03 -2.3685e+02 -3.4699e+01 1.1657e+02
FAMILY_FRIENDLY -5.9879e+05 -5.0927e+04 2.6173e+04 2.2481e+05
FREEHOLD -1.6340e+05 4.0765e+04 1.9023e+05 3.7960e+05
Max.
Intercept 18758355
AREA_SQM 23064
AGE 13303
PROX_CBD 11346650
PROX_CHILDCARE 2892127
PROX_ELDERLYCARE 2465671
PROX_URA_GROWTH_AREA 7384059
PROX_MRT 1186242
PROX_PARK 2588497
PROX_PRIMARY_SCH 3381462
PROX_SHOPPING_MALL 38038564
PROX_BUS_STOP 12081592
NO_Of_UNITS 1010
FAMILY_FRIENDLY 2072414
FREEHOLD 1813995
************************Diagnostic information*************************
Number of data points: 1436
Effective number of parameters (2trace(S) - trace(S'S)): 350.3088
Effective degrees of freedom (n-2trace(S) + trace(S'S)): 1085.691
AICc (GWR book, Fotheringham, et al. 2002, p. 61, eq 2.33): 41982.22
AIC (GWR book, Fotheringham, et al. 2002,GWR p. 96, eq. 4.22): 41546.74
BIC (GWR book, Fotheringham, et al. 2002,GWR p. 61, eq. 2.34): 41914.08
Residual sum of squares: 2.528227e+14
R-square value: 0.8912425
Adjusted R-square value: 0.8561185
***********************************************************************
Program stops at: 2022-12-15 23:55:58
The report shows that the adjusted \(R^2\) of the gwr is 0.8561 which is significantly better than the global multiple linear regression model of 0.6472 but again, we should not look at the \(R^2\). Looking at the AICc of the adaptive distance gwr which is 41,982.22, we see that it is even smaller than the AICc of the fixed distance gwr of 42,263.61.
Simple feature collection with 1436 features and 51 fields
Geometry type: POINT
Dimension: XY
Bounding box: xmin: 14940.85 ymin: 24765.67 xmax: 43352.45 ymax: 48382.81
Projected CRS: SVY21 / Singapore TM
First 10 features:
Intercept AREA_SQM AGE PROX_CBD PROX_CHILDCARE PROX_ELDERLYCARE
1 2050011.7 9561.892 -9514.634 -120681.9 319266.92 -393417.79
2 1633128.2 16576.853 -58185.479 -149434.2 441102.18 325188.74
3 3433608.2 13091.861 -26707.386 -259397.8 -120116.82 535855.81
4 234358.9 20730.601 -93308.988 2426853.7 480825.28 314783.72
5 2285804.9 6722.836 -17608.018 -316835.5 90764.78 -137384.61
6 -3568877.4 6039.581 -26535.592 327306.1 -152531.19 -700392.85
7 -2874842.4 16843.575 -59166.727 -983577.2 -177810.50 -122384.02
8 2038086.0 6905.135 -17681.897 -285076.6 70259.40 -96012.78
9 1718478.4 9580.703 -14401.128 105803.4 -657698.02 -123276.00
10 3457054.0 14072.011 -31579.884 -234895.4 79961.45 548581.04
PROX_URA_GROWTH_AREA PROX_MRT PROX_PARK PROX_PRIMARY_SCH
1 -159980.20 -299742.96 -172104.47 242668.03
2 -142290.39 -2510522.23 523379.72 1106830.66
3 -253621.21 -936853.28 209099.85 571462.33
4 -2679297.89 -2039479.50 -759153.26 3127477.21
5 303714.81 -44567.05 -10284.62 30413.56
6 -28051.25 733566.47 1511488.92 320878.23
7 1397676.38 -2745430.34 710114.74 1786570.95
8 269368.71 -14552.99 73533.34 53359.73
9 -361974.72 -476785.32 -132067.59 -40128.92
10 -150024.38 -1503835.53 574155.47 108996.67
PROX_SHOPPING_MALL PROX_BUS_STOP NO_Of_UNITS FAMILY_FRIENDLY FREEHOLD
1 300881.390 1210615.4 104.8290640 -9075.370 303955.6
2 -87693.378 1843587.2 -288.3441183 310074.664 396221.3
3 -126732.712 1411924.9 -9.5532945 5949.746 168821.7
4 -29593.342 7225577.5 -161.3551620 1556178.531 1212515.6
5 -7490.586 677577.0 42.2659674 58986.951 328175.2
6 258583.881 1086012.6 -214.3671271 201992.641 471873.1
7 -384251.210 5094060.5 -0.9212521 359659.512 408871.9
8 -39634.902 735767.1 30.1741069 55602.506 347075.0
9 276718.757 2815772.4 675.1615559 -30453.297 503872.8
10 -454726.822 2123557.0 -21.3044311 -100935.586 213324.6
y yhat residual CV_Score Stud_residual Intercept_SE AREA_SQM_SE
1 3000000 2886532 113468.16 0 0.38207013 516105.5 823.2860
2 3880000 3466801 413198.52 0 1.01433140 488083.5 825.2380
3 3325000 3616527 -291527.20 0 -0.83780678 963711.4 988.2240
4 4250000 5435482 -1185481.63 0 -2.84614670 444185.5 617.4007
5 1400000 1388166 11834.26 0 0.03404453 2119620.6 1376.2778
6 1320000 1516702 -196701.94 0 -0.72065800 28572883.7 2348.0091
7 3410000 3266881 143118.77 0 0.41291992 679546.6 893.5893
8 1420000 1431955 -11955.27 0 -0.03033109 2217773.1 1415.2604
9 2025000 1832799 192200.83 0 0.52018109 814281.8 943.8434
10 2550000 2223364 326635.53 0 1.10559735 2410252.0 1271.4073
AGE_SE PROX_CBD_SE PROX_CHILDCARE_SE PROX_ELDERLYCARE_SE
1 5889.782 37411.22 319111.1 120633.34
2 6226.916 23615.06 299705.3 84546.69
3 6510.236 56103.77 349128.5 129687.07
4 6010.511 469337.41 304965.2 127150.69
5 8180.361 410644.47 698720.6 327371.55
6 14601.909 5272846.47 1141599.8 1653002.19
7 8970.629 346164.20 530101.1 148598.71
8 8661.309 438035.69 742532.8 399221.05
9 11791.208 89148.35 704630.7 329683.30
10 9941.980 173532.77 500976.2 281876.74
PROX_URA_GROWTH_AREA_SE PROX_MRT_SE PROX_PARK_SE PROX_PRIMARY_SCH_SE
1 56207.39 185181.3 205499.6 152400.7
2 76956.50 281133.9 229358.7 165150.7
3 95774.60 275483.7 314124.3 196662.6
4 470762.12 279877.1 227249.4 240878.9
5 474339.56 363830.0 364580.9 249087.7
6 5496627.21 730453.2 1741712.0 683265.5
7 371692.97 375511.9 297400.9 344602.8
8 517977.91 423155.4 440984.4 261251.2
9 153436.22 285325.4 304998.4 278258.5
10 239182.57 571355.7 599131.8 331284.8
PROX_SHOPPING_MALL_SE PROX_BUS_STOP_SE NO_Of_UNITS_SE FAMILY_FRIENDLY_SE
1 109268.8 600668.6 218.1258 131474.7
2 98906.8 410222.1 208.9410 114989.1
3 119913.3 464156.7 210.9828 146607.2
4 177104.1 562810.8 361.7767 108726.6
5 301032.9 740922.4 299.5034 160663.7
6 2931208.6 1418333.3 602.5571 331727.0
7 249969.5 821236.4 532.1978 129241.2
8 351634.0 775038.4 338.6777 171895.1
9 289872.7 850095.5 439.9037 220223.4
10 265529.7 631399.2 259.0169 189125.5
FREEHOLD_SE Intercept_TV AREA_SQM_TV AGE_TV PROX_CBD_TV
1 115954.0 3.9720784 11.614302 -1.615447 -3.22582173
2 130110.0 3.3460017 20.087361 -9.344188 -6.32792021
3 141031.5 3.5629010 13.247868 -4.102368 -4.62353528
4 138239.1 0.5276150 33.577223 -15.524302 5.17080808
5 210641.1 1.0784029 4.884795 -2.152474 -0.77155660
6 374347.3 -0.1249043 2.572214 -1.817269 0.06207388
7 182216.9 -4.2305303 18.849348 -6.595605 -2.84136028
8 216649.4 0.9189786 4.879056 -2.041481 -0.65080678
9 220473.7 2.1104224 10.150733 -1.221345 1.18682383
10 206346.2 1.4343123 11.068059 -3.176418 -1.35360852
PROX_CHILDCARE_TV PROX_ELDERLYCARE_TV PROX_URA_GROWTH_AREA_TV PROX_MRT_TV
1 1.00048819 -3.2612693 -2.846248368 -1.61864578
2 1.47178634 3.8462625 -1.848971738 -8.92998600
3 -0.34404755 4.1319138 -2.648105057 -3.40075727
4 1.57665606 2.4756745 -5.691404992 -7.28705261
5 0.12990138 -0.4196596 0.640289855 -0.12249416
6 -0.13361179 -0.4237096 -0.005103357 1.00426206
7 -0.33542751 -0.8235874 3.760298131 -7.31116712
8 0.09462126 -0.2405003 0.520038994 -0.03439159
9 -0.93339393 -0.3739225 -2.359121712 -1.67102293
10 0.15961128 1.9461735 -0.627237944 -2.63204802
PROX_PARK_TV PROX_PRIMARY_SCH_TV PROX_SHOPPING_MALL_TV PROX_BUS_STOP_TV
1 -0.83749312 1.5923022 2.75358842 2.0154464
2 2.28192684 6.7019454 -0.88662640 4.4941192
3 0.66565951 2.9058009 -1.05686949 3.0419145
4 -3.34061770 12.9836105 -0.16709578 12.8383775
5 -0.02820944 0.1220998 -0.02488294 0.9145046
6 0.86781794 0.4696245 0.08821750 0.7656963
7 2.38773567 5.1844351 -1.53719231 6.2029165
8 0.16674816 0.2042469 -0.11271635 0.9493299
9 -0.43301073 -0.1442145 0.95462153 3.3123012
10 0.95831249 0.3290120 -1.71252687 3.3632555
NO_Of_UNITS_TV FAMILY_FRIENDLY_TV FREEHOLD_TV Local_R2
1 0.480589953 -0.06902748 2.621347 0.8846744
2 -1.380026395 2.69655779 3.045280 0.8899773
3 -0.045279967 0.04058290 1.197050 0.8947007
4 -0.446007570 14.31276425 8.771149 0.9073605
5 0.141120178 0.36714544 1.557983 0.9510057
6 -0.355762335 0.60891234 1.260522 0.9247586
7 -0.001731033 2.78285441 2.243875 0.8310458
8 0.089093858 0.32346758 1.602012 0.9463936
9 1.534793921 -0.13828365 2.285410 0.8380365
10 -0.082251138 -0.53369623 1.033819 0.9080753
geometry
1 POINT (22085.12 29951.54)
2 POINT (25656.84 34546.2)
3 POINT (23963.99 32890.8)
4 POINT (27044.28 32319.77)
5 POINT (41042.56 33743.64)
6 POINT (39717.04 32943.1)
7 POINT (28419.1 33513.37)
8 POINT (40763.57 33879.61)
9 POINT (23595.63 28884.78)
10 POINT (24586.56 33194.31)
Rows: 1,436
Columns: 77
$ POSTCODE <dbl> 118635, 288420, 267833, 258380, 467169, 466472…
$ SELLING_PRICE <dbl> 3000000, 3880000, 3325000, 4250000, 1400000, 1…
$ AREA_SQM <dbl> 309, 290, 248, 127, 145, 139, 218, 141, 165, 1…
$ AGE <dbl> 30, 32, 33, 7, 28, 22, 24, 24, 27, 31, 17, 22,…
$ PROX_CBD <dbl> 7.941259, 6.609797, 6.898000, 4.038861, 11.783…
$ PROX_CHILDCARE <dbl> 0.16597932, 0.28027246, 0.42922669, 0.39473543…
$ PROX_ELDERLYCARE <dbl> 2.5198118, 1.9333338, 0.5021395, 1.9910316, 1.…
$ PROX_URA_GROWTH_AREA <dbl> 6.618741, 7.505109, 6.463887, 4.906512, 6.4106…
$ PROX_HAWKER_MARKET <dbl> 1.76542207, 0.54507614, 0.37789301, 1.68259969…
$ PROX_KINDERGARTEN <dbl> 0.05835552, 0.61592412, 0.14120309, 0.38200076…
$ PROX_MRT <dbl> 0.5607188, 0.6584461, 0.3053433, 0.6910183, 0.…
$ PROX_PARK <dbl> 1.1710446, 0.1992269, 0.2779886, 0.9832843, 0.…
$ PROX_PRIMARY_SCH <dbl> 1.6340256, 0.9747834, 1.4715016, 1.4546324, 0.…
$ PROX_TOP_PRIMARY_SCH <dbl> 3.3273195, 0.9747834, 1.4715016, 2.3006394, 0.…
$ PROX_SHOPPING_MALL <dbl> 2.2102717, 2.9374279, 1.2256850, 0.3525671, 1.…
$ PROX_SUPERMARKET <dbl> 0.9103958, 0.5900617, 0.4135583, 0.4162219, 0.…
$ PROX_BUS_STOP <dbl> 0.10336166, 0.28673408, 0.28504777, 0.29872340…
$ NO_Of_UNITS <dbl> 18, 20, 27, 30, 30, 31, 32, 32, 32, 32, 34, 34…
$ FAMILY_FRIENDLY <dbl> 0, 0, 0, 0, 0, 1, 1, 0, 1, 1, 0, 0, 0, 0, 0, 0…
$ FREEHOLD <dbl> 1, 1, 1, 1, 1, 1, 1, 1, 1, 0, 1, 1, 1, 1, 1, 1…
$ LEASEHOLD_99YR <dbl> 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0…
$ LOG_SELLING_PRICE <dbl> 14.91412, 15.17135, 15.01698, 15.26243, 14.151…
$ MLR_RES <dbl> -1489099.55, 415494.57, 194129.69, 1088992.71,…
$ Intercept <dbl> 2050011.67, 1633128.24, 3433608.17, 234358.91,…
$ AREA_SQM.1 <dbl> 9561.892, 16576.853, 13091.861, 20730.601, 672…
$ AGE.1 <dbl> -9514.634, -58185.479, -26707.386, -93308.988,…
$ PROX_CBD.1 <dbl> -120681.94, -149434.22, -259397.77, 2426853.66…
$ PROX_CHILDCARE.1 <dbl> 319266.925, 441102.177, -120116.816, 480825.28…
$ PROX_ELDERLYCARE.1 <dbl> -393417.795, 325188.741, 535855.806, 314783.72…
$ PROX_URA_GROWTH_AREA.1 <dbl> -159980.203, -142290.389, -253621.206, -267929…
$ PROX_MRT.1 <dbl> -299742.96, -2510522.23, -936853.28, -2039479.…
$ PROX_PARK.1 <dbl> -172104.47, 523379.72, 209099.85, -759153.26, …
$ PROX_PRIMARY_SCH.1 <dbl> 242668.03, 1106830.66, 571462.33, 3127477.21, …
$ PROX_SHOPPING_MALL.1 <dbl> 300881.390, -87693.378, -126732.712, -29593.34…
$ PROX_BUS_STOP.1 <dbl> 1210615.44, 1843587.22, 1411924.90, 7225577.51…
$ NO_Of_UNITS.1 <dbl> 104.8290640, -288.3441183, -9.5532945, -161.35…
$ FAMILY_FRIENDLY.1 <dbl> -9075.370, 310074.664, 5949.746, 1556178.531, …
$ FREEHOLD.1 <dbl> 303955.61, 396221.27, 168821.75, 1212515.58, 3…
$ y <dbl> 3000000, 3880000, 3325000, 4250000, 1400000, 1…
$ yhat <dbl> 2886531.8, 3466801.5, 3616527.2, 5435481.6, 13…
$ residual <dbl> 113468.16, 413198.52, -291527.20, -1185481.63,…
$ CV_Score <dbl> 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0…
$ Stud_residual <dbl> 0.38207013, 1.01433140, -0.83780678, -2.846146…
$ Intercept_SE <dbl> 516105.5, 488083.5, 963711.4, 444185.5, 211962…
$ AREA_SQM_SE <dbl> 823.2860, 825.2380, 988.2240, 617.4007, 1376.2…
$ AGE_SE <dbl> 5889.782, 6226.916, 6510.236, 6010.511, 8180.3…
$ PROX_CBD_SE <dbl> 37411.22, 23615.06, 56103.77, 469337.41, 41064…
$ PROX_CHILDCARE_SE <dbl> 319111.1, 299705.3, 349128.5, 304965.2, 698720…
$ PROX_ELDERLYCARE_SE <dbl> 120633.34, 84546.69, 129687.07, 127150.69, 327…
$ PROX_URA_GROWTH_AREA_SE <dbl> 56207.39, 76956.50, 95774.60, 470762.12, 47433…
$ PROX_MRT_SE <dbl> 185181.3, 281133.9, 275483.7, 279877.1, 363830…
$ PROX_PARK_SE <dbl> 205499.6, 229358.7, 314124.3, 227249.4, 364580…
$ PROX_PRIMARY_SCH_SE <dbl> 152400.7, 165150.7, 196662.6, 240878.9, 249087…
$ PROX_SHOPPING_MALL_SE <dbl> 109268.8, 98906.8, 119913.3, 177104.1, 301032.…
$ PROX_BUS_STOP_SE <dbl> 600668.6, 410222.1, 464156.7, 562810.8, 740922…
$ NO_Of_UNITS_SE <dbl> 218.1258, 208.9410, 210.9828, 361.7767, 299.50…
$ FAMILY_FRIENDLY_SE <dbl> 131474.73, 114989.07, 146607.22, 108726.62, 16…
$ FREEHOLD_SE <dbl> 115954.0, 130110.0, 141031.5, 138239.1, 210641…
$ Intercept_TV <dbl> 3.9720784, 3.3460017, 3.5629010, 0.5276150, 1.…
$ AREA_SQM_TV <dbl> 11.614302, 20.087361, 13.247868, 33.577223, 4.…
$ AGE_TV <dbl> -1.6154474, -9.3441881, -4.1023685, -15.524301…
$ PROX_CBD_TV <dbl> -3.22582173, -6.32792021, -4.62353528, 5.17080…
$ PROX_CHILDCARE_TV <dbl> 1.000488185, 1.471786337, -0.344047555, 1.5766…
$ PROX_ELDERLYCARE_TV <dbl> -3.26126929, 3.84626245, 4.13191383, 2.4756745…
$ PROX_URA_GROWTH_AREA_TV <dbl> -2.846248368, -1.848971738, -2.648105057, -5.6…
$ PROX_MRT_TV <dbl> -1.61864578, -8.92998600, -3.40075727, -7.2870…
$ PROX_PARK_TV <dbl> -0.83749312, 2.28192684, 0.66565951, -3.340617…
$ PROX_PRIMARY_SCH_TV <dbl> 1.59230221, 6.70194543, 2.90580089, 12.9836104…
$ PROX_SHOPPING_MALL_TV <dbl> 2.753588422, -0.886626400, -1.056869486, -0.16…
$ PROX_BUS_STOP_TV <dbl> 2.0154464, 4.4941192, 3.0419145, 12.8383775, 0…
$ NO_Of_UNITS_TV <dbl> 0.480589953, -1.380026395, -0.045279967, -0.44…
$ FAMILY_FRIENDLY_TV <dbl> -0.06902748, 2.69655779, 0.04058290, 14.312764…
$ FREEHOLD_TV <dbl> 2.6213469, 3.0452799, 1.1970499, 8.7711485, 1.…
$ Local_R2 <dbl> 0.8846744, 0.8899773, 0.8947007, 0.9073605, 0.…
$ coords.x1 <dbl> 22085.12, 25656.84, 23963.99, 27044.28, 41042.…
$ coords.x2 <dbl> 29951.54, 34546.20, 32890.80, 32319.77, 33743.…
$ geometry <POINT [m]> POINT (22085.12 29951.54), POINT (25656.…
The code chunks below is used to create an interactive point symbol map.
The code chunks below is used to create an interactive point symbol map.
tmap_mode("view")
AREA_SQM_SE <- tm_shape(mpsz_svy21)+
tm_polygons(alpha = 0.1) +
tm_shape(condo_resale.sf.adaptive) +
tm_dots(col = "AREA_SQM_SE",
border.col = "gray60",
border.lwd = 1,
palette = "RdPu") +
tm_view(set.zoom.limits = c(11,14))
AREA_SQM_TV <- tm_shape(mpsz_svy21)+
tm_polygons(alpha = 0.1) +
tm_shape(condo_resale.sf.adaptive) +
tm_dots(col = "AREA_SQM_TV",
border.col = "gray60",
border.lwd = 1,
palette = "RdPu") +
tm_view(set.zoom.limits = c(11,14))
tmap_arrange(AREA_SQM_SE, AREA_SQM_TV,
asp=1, ncol=2,
sync = TRUE)The code chunk below changes the boundaries or shapes to only those in the “CENTRAL REGION”.
---
title: "In-class Exercise 4: Calibrating Hedonic Pricing Model for Private Highrise Property with GWR Method (Updated)"
editor: visual
format: html
execute:
warning: false
---
# Overview
This is an in-class exercise that is an extension of [Hands-on Exercise 4](https://acapgeolano.netlify.app/hands-on_ex/hands-on_ex4/hands-on_ex4 "acapgeolano - Hands-on Exercise 4") based on [Chapter 6](https://r4gdsa.netlify.app/chap06.html "R4GDSA:Calibrating Hedonic Pricing Model for Private Highrise Property with GWR Method") of [R for Geospatial Data Science and Analytics](https://r4gdsa.netlify.app/) by Dr. Kam Tin Seong and is a requirement under the class ISS624: Geospatial Analytics and Applications.
Here we go over some changes from the original hands-on exercise, fix some errors and add some notes on discussion.
## The Analytical Question
How are prices determined? Hedonic pricing is a model that identifies price factors according to the premise that price is determined both by internal characteristics of the good being sold and external factors affecting it. This is often used in the field of real estate to estimate property values. In this exercise, we determine to what extent certain structural and locational variables affected the resale prices of condominiums in 2015.
## The Main Concept: Geographically Weighted Regression (GWR)
**Geographically weighted regression (GWR)** is a spatial statistical technique that takes non-stationary variables into consideration (e.g., climate; demographic factors; physical environment characteristics) and models the local relationships between these independent variables and an outcome of interest (also known as dependent variable). In this exercise, we use GWR methods to build hedonic pricing models.
# Getting Started
## Loading the Packages
The code chunk loads the necessary packages for the exercise.
```{r}
pacman::p_load(olsrr, corrplot, ggpubr, sf, spdep, GWmodel, tmap, tidyverse, gtsummary)
```
::: {.callout-note icon="false"}
## 🎮 LEVEL UP!
**NEW PACKAGES UNLOCKED: `olsrr`, `GWmodel`, `gtsummary`**
- [**`olsrr`**](https://olsrr.rsquaredacademy.com/ "olsrr") - used for building OLS regression models
- [**`GWmodel`**](https://cran.r-project.org/web/packages/GWmodel/ "CRAN: GWmodel") - stands for "geographically weighted models"; used for calibrating geographical weighted family of models
- [**`gtsummary`**](https://www.danieldsjoberg.com/gtsummary/ "gtsummary") - used to create elegant and flexible publication-ready analytical and summary tables
:::
# Geospatial Data Wrangling
## Importing the Geospatial Data
The geospatial data used in this hands-on exercise is called '*MP14_SUBZONE_WEB_PL*' which is in ESRI shapefile format. It defines the URA Master Plan 2014's planning subzone boundaries. Polygon features are used to represent these geographic boundaries. The GIS data is in the 'SVY21' projected coordinates system.
The code chunk below is used to import '*MP_SUBZONE_WEB_PL'* shapefile by using `st_read()` of **sf** packages.
```{r}
mpsz = st_read(dsn = "data/geospatial", layer = "MP14_SUBZONE_WEB_PL")
```
## Updating CRS Information
Since the simple feature object '*mpsz*' does not have EPSG information, the code chunk below updates the newly imported '*mpsz'* with the correct ESPG code (i.e. 3414).
```{r}
mpsz_svy21 <- st_transform(mpsz, 3414)
```
```{r}
#| output: false
#| echo: false
st_make_valid(mpsz_svy21)
```
The code chunk below uses `st_crs()` to verify the newly transformed '*mpsz_svy21'* has EPSG set to 3414.
```{r}
st_crs(mpsz_svy21)
```
Next, we see the extent of '*mpsz_svy21'* using the `st_bbox()` of **`sf`** package.
```{r}
st_bbox(mpsz_svy21)
```
# Aspatial Data Wrangling
## Importing the Aspatial Data
The '*condo_resale_2015'* is in csv file format. The codes chunk below uses `read_csv()` function of **readr** package to import'*condo_resale_2015'* into R as a tibble data frame called '*condo_resale'*.
```{r}
condo_resale = read_csv("data/aspatial/Condo_resale_2015.csv")
```
The code chunk below uses `glimpse()` to view the data structure of the columns.
```{r}
glimpse(condo_resale)
```
The code chunk below looks at the data in the `'XCOORD'` column.
```{r}
head(condo_resale$LONGITUDE)
```
The code chunk below looks at the data in the `'YCOORD'` column.
```{r}
head(condo_resale$LATITUDE)
```
Next, the function `summary()` is used to display the summary statistics of '*cond_resale'* tibble data frame.
```{r}
summary(condo_resale)
```
## Converting Tibble to Simple Feature Object
The code chunk below uses the function `st_as_sf()` to convert our tibble data frame to a simple feature data frame. We also use `st_transform()` once again to convert the coordinates WGS84 to SVY21 (which is the projected CRS of our geospatial data).
```{r}
condo_resale.sf <- st_as_sf(condo_resale,
coords = c("LONGITUDE", "LATITUDE"),
crs = 4326) %>%
st_transform(crs = 3414)
```
```{r}
head(condo_resale.sf)
```
We now have a POINT feature data frame!
# Exploratory Data Analysis (EDA)
## Statistical Graphics
```{r}
#| fig-width: 12
ggplot(data=condo_resale.sf, aes(x=`SELLING_PRICE`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
```
::: {.callout-note icon="false"}
## 🔎 OBSERVATION!
The figure above reveals a right skewed distribution. This means that more condominium units were transacted at relative lower prices.
:::
Since distribution for `'SELLING_PRICE'` is skewed, we need to normalize it. In this case we use **log transformation**. The code chunk below uses `mutate()` to apply the `log()` function to the `'SELLING_PRICE'` column.
```{r}
condo_resale.sf <- condo_resale.sf %>%
mutate(`LOG_SELLING_PRICE` = log(SELLING_PRICE))
```
```{r}
#| fig-width: 12
ggplot(data=condo_resale.sf, aes(x=`LOG_SELLING_PRICE`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
```
::: {.callout-note icon="false"}
## 🌸 NEW OBSERVATION!
Visually, we can clearly see the distribution has moved towards the center and is closer to looking like a normal distribution.
:::
## Multiple Histogram Plots Distribution of Variables
```{r}
#| fig-width: 12
AREA_SQM <- ggplot(data=condo_resale.sf, aes(x= `AREA_SQM`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
AGE <- ggplot(data=condo_resale.sf, aes(x= `AGE`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_CBD <- ggplot(data=condo_resale.sf, aes(x= `PROX_CBD`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_CHILDCARE <- ggplot(data=condo_resale.sf, aes(x= `PROX_CHILDCARE`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_ELDERLYCARE <- ggplot(data=condo_resale.sf, aes(x= `PROX_ELDERLYCARE`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_URA_GROWTH_AREA <- ggplot(data=condo_resale.sf,
aes(x= `PROX_URA_GROWTH_AREA`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_HAWKER_MARKET <- ggplot(data=condo_resale.sf, aes(x= `PROX_HAWKER_MARKET`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_KINDERGARTEN <- ggplot(data=condo_resale.sf, aes(x= `PROX_KINDERGARTEN`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_MRT <- ggplot(data=condo_resale.sf, aes(x= `PROX_MRT`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_PARK <- ggplot(data=condo_resale.sf, aes(x= `PROX_PARK`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_PRIMARY_SCH <- ggplot(data=condo_resale.sf, aes(x= `PROX_PRIMARY_SCH`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
PROX_TOP_PRIMARY_SCH <- ggplot(data=condo_resale.sf,
aes(x= `PROX_TOP_PRIMARY_SCH`)) +
geom_histogram(bins=20, color="black", fill="#e3879e")
ggarrange(AREA_SQM, AGE, PROX_CBD, PROX_CHILDCARE, PROX_ELDERLYCARE,
PROX_URA_GROWTH_AREA, PROX_HAWKER_MARKET, PROX_KINDERGARTEN, PROX_MRT,
PROX_PARK, PROX_PRIMARY_SCH, PROX_TOP_PRIMARY_SCH,
ncol = 3, nrow = 4)
```
## Drawing Statistical Point Map
Lastly, we want to reveal the geospatial distribution condominium resale prices in Singapore. The map will be prepared using the **`tmap`** package.
First, we will turn on the interactive mode of tmap by setting `tmap_mode()` to "view".
```{r}
tmap_mode("view")
```
Next, the code chunks below is used to create an interactive point symbol map.
```{r}
#| output: false
#| echo: false
tmap_options(check.and.fix = TRUE)
```
```{r}
#| fig-width: 12
tm_shape(mpsz_svy21)+
tm_polygons() +
tm_shape(condo_resale.sf) +
tm_dots(col = "SELLING_PRICE",
alpha = 0.6,
style ="quantile",
palette = "RdPu") +
tm_view(set.zoom.limits = c(11,14))
```
The dots shown in the map above represent the condos.
::: {.callout-note icon="false"}
## ❗ TAKE NOTE!
You may encounter an error telling you that the shape includes invalid polygons. Unfortunately, the reality is even if the these files are taken from official sources, there may still be some errors. One such error is out of place tiny polygons in the center. You may not see it but if you check the code, you'll see it as data. The easiest fix for this is to run `tmap_options(check.and.fix = TRUE)`.
:::
Now we need to set `tmap_mode()` back to "plot" for future use.
```{r}
tmap_mode("plot")
```
# Hedonic Pricing Modelling in R
## Simple Linear Regression Method
First, we build a simple linear regression model by using `'SELLING_PRICE'` as the dependent variable and `'AREA_SQM'` as the independent variable. The code chunk below uses `lm()` to fit the linear model.
```{r}
condo.slr <- lm(formula = SELLING_PRICE ~ AREA_SQM,
data = condo_resale.sf)
```
The code chunk below uses `summary()` to view information on the model.
```{r}
summary(condo.slr)
```
The output report reveals that the `'SELLING_PRICE'` can be explained by using the formula:
$$ y = -258131.1 + 14719x_1$$
The $R^2$ of 0.4518 reveals that the simple regression model built is able to explain about 45% of the resale prices.
Since p-value is much smaller than 0.0001, we will reject the null hypothesis that mean is a good estimator of `'SELLING_PRICE'`. This will allow us to infer that simple linear regression model above is a good estimator of `'SELLING_PRICE'`.
To visualize the best fit curve on a scatterplot, we can incorporate `lm()` as a method function in ggplot's geometry as shown in the code chunk below.
```{r}
#| fig-width: 12
ggplot(data=condo_resale.sf,
aes(x=`AREA_SQM`, y=`SELLING_PRICE`)) +
geom_point(col = "#cb6a82") +
geom_smooth(method = lm, col = "#704276")
```
The figure above reveals that there are a few statistical outliers with relatively high selling prices.
## Multiple Linear Regression Method
Before building a multiple regression model, it is important to ensure that the indepdent variables used are not highly correlated to each other.
Correlation matrix is commonly used to visualize the relationships between the independent variables. Beside the `pairs()` of R, there are many packages support the display of a correlation matrix. In this section, the **`corrplot`** package will be used.
The code chunk below is used to plot a scatterplot matrix of the relationship between the independent variables in '*condo_resale'* data frame.
```{r}
#| fig-width: 12
#| fig-height: 12
corrplot(cor(condo_resale[, 5:23]),
diag = FALSE, order = "AOE",
tl.pos = "td",
tl.cex = 0.5,
method = "number",
type = "upper")
```
::: callout-note
## ❗ TAKE NOTE!
If you squint, you'll realize that we use the tibble `'condo_resale'` for the `cor()` function. We didn't use `'condo_resale.sf'` we made because we need to use non-geospatial data, without the hidden geometry column.
:::
Matrix reorder is very important for mining the hidden structure and patterns in the matrix. There are four methods in **`corrplot`**(parameter order), named "AOE", "FPC", "hclust", "alphabet"). In the code chunk above, AOE order is used. It orders the variables by using the ***angular order** of the eigenvectors* method suggested by [Michael Friendly](https://www.datavis.ca/papers/corrgram.pdf).
From the scatterplot matrix, it is clear that 'Freehold*'* is highly correlated to 'LEASE_99YEAR'. In line with this, it is wiser to only include either one of them in the subsequent model building. As a result, 'LEASE_99YEAR' is excluded in the subsequent model building.
## Hedonic Pricing Model Using Multiple Linear Regression Method
```{r}
condo.mlr <- lm(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD + PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_HAWKER_MARKET +
PROX_KINDERGARTEN +
PROX_MRT + PROX_PARK +
PROX_PRIMARY_SCH +
PROX_TOP_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_SUPERMARKET +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data=condo_resale.sf)
summary(condo.mlr)
```
With reference to the report above, it is clear that not all the independent variables are statistically significant. We will revised the model by removing those variables which are not statistically significant.
### Preparing Publication Quality Table
The code chunk below uses `ols_regress()` to create a more visually appealing and readable summary of the model.
```{r}
condo.mlr1 <- lm(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD + PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA + PROX_MRT +
PROX_PARK +
PROX_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data=condo_resale.sf)
ols_regress(condo.mlr1)
```
The adjusted $R^2$ is 0.647.
The code chunk below uses `tbl_regression()` to create a well formatted regression report.
```{r}
tbl_regression(condo.mlr1,
intercept = TRUE) %>%
add_glance_source_note(
label = list(sigma ~ "\U03C3"),
include = c(r.squared, adj.r.squared,
AIC, statistic,
p.value, sigma))
```
::: {.callout-note icon="false"}
## 💡 INTERPRETATION
Every unit of the characteristic increases or decreases by the 'Beta'. For example, whether the property is freehold or not increases the resale price by SGD 350,000.
:::
### Checking for Multicolinearity
In the code chunk below, the [`ols_vif_tol()`](https://olsrr.rsquaredacademy.com/reference/ols_coll_diag.html) of **`olsrr`** package is used to test if there are sign of multicollinearity.
```{r}
ols_vif_tol(condo.mlr1)
```
Since the VIF of the independent variables are less than 10. We can safely conclude that there are no sign of multicollinearity among the independent variables.
### Test for Non-Linearity
In the code chunk below, the [`ols_plot_resid_fit()`](https://olsrr.rsquaredacademy.com/reference/ols_plot_resid_fit.html) of **`olsrr`** package is used to perform linearity assumption test.
```{r}
#| fig-width: 12
ols_plot_resid_fit(condo.mlr1)
```
The figure above reveals that most of the data points are scattered around the 0 line, hence we can safely conclude that the relationships between the dependent variable and independent variables are linear.
### Test for Normality Assumption
Lastly, the code chunk below uses [`ols_plot_resid_hist()`](https://olsrr.rsquaredacademy.com/reference/ols_plot_resid_hist.html) of **`olsrr`** package to perform normality assumption test.
```{r}
#| fig-width: 12
ols_plot_resid_hist(condo.mlr1)
```
The figure reveals that the residual of the multiple linear regression model (i.e. condo.mlr1) is resemble normal distribution.
If you prefer formal statistical test methods, the [`ols_test_normality()`](https://olsrr.rsquaredacademy.com/reference/ols_test_normality.html) of **`olsrr`** package can be used as shown in the code chunk below.
```{r}
ols_test_normality(condo.mlr1)
```
The summary table above reveals that the p-values of the four tests are way smaller than the alpha value of 0.05. Hence we will reject the null hypothesis and infer that there is statistical evidence that the residuals are not normally distributed.
### Testing for Spatial Autocorrelation
The hedonic model is using geographically referenced attributes, hence it is also important for us to visual the residual of the hedonic pricing model.
In order to perform spatial autocorrelation test, we need to convert ''condo_resale.sf' from a simple features data frame to a **SpatialPointsDataFrame**.
First, we will export the residual of the hedonic pricing model and save it as a data frame and join the newly created data frame with the 'condo_resales.sf' object.
```{r}
mlr.output <- as.data.frame(condo.mlr1$residuals)
condo_resale.res.sf <- cbind(condo_resale.sf,
condo.mlr1$residuals) %>%
rename(`MLR_RES` = `condo.mlr1.residuals`)
```
Next, we will convert 'condo_resale.res.sf' from a simple feature object into a SpatialPointsDataFrame because spdep package can only process sp conformed spatial data objects.
```{r}
condo_resale.sp <- as_Spatial(condo_resale.res.sf)
condo_resale.sp
```
Now we can view the residuals mapped using **`tmap`** .
```{r}
#| fig-width: 12
tmap_mode("view")
tm_shape(mpsz_svy21)+
tmap_options(check.and.fix = TRUE) +
tm_polygons(alpha = 0.4) +
tm_shape(condo_resale.res.sf) +
tm_dots(col = "MLR_RES",
alpha = 0.6,
style="quantile",
palette = "RdPu") +
tm_view(set.zoom.limits = c(11,14))
```
```{r}
#| echo: false
#| output: false
tmap_mode("plot")
```
The figure above reveals that there is sign of spatial autocorrelation.
To prove that our observation is indeed true, the Moran's I test will be performed. To do that we need to create our distance-based weight matrix using `dnearneigh()`.
```{r}
nb <- dnearneigh(coordinates(condo_resale.sp),
0,
1500,
longlat = FALSE)
# longlat is FALSE cause XY coords
summary(nb)
```
Next, `nb2listw()` will be used to convert the output neighbours lists into a spatial weights.
```{r}
nb_lw <- nb2listw(nb, style = 'W')
summary(nb_lw)
```
Finally we do the Moran's I test using `lm.morantest()` for residual spatial autocorrelation.
```{r}
lm.morantest(condo.mlr1, nb_lw)
```
The Global Moran's I test for residual spatial autocorrelation shows that it's **p-value is less than 0.00000000000000022** which is less than the alpha value of 0.05. Hence, we will reject the null hypothesis that the residuals are randomly distributed.
Since the **Observed Global Moran I = 0.1424418** which is greater than 0, we can infer than the residuals resemble cluster distribution.
## Building Hedonic Pricing Models using GWmodel
### Building Fixed Bandwidth GWR Model
### Computing fixed bandwidth
```{r}
bw.fixed <- bw.gwr(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD +
PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_MRT +
PROX_PARK +
PROX_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data = condo_resale.sp,
approach = "CV",
kernel = "gaussian",
adaptive = FALSE,
longlat = FALSE)
```
The result shows that the recommended bandwidth is **971.3405 meters**. We use meters because that is the unit of measurement of our projected coordinate system.
#### GWModel method - fixed bandwidth
```{r}
gwr.fixed <- gwr.basic(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD +
PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_MRT +
PROX_PARK +
PROX_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data=condo_resale.sp,
bw=bw.fixed,
kernel = 'gaussian',
longlat = FALSE)
```
The output is saved in a list of class "gwrm". The code below can be used to display the model output.
```{r}
gwr.fixed
```
The report shows that the adjusted $R^2$ of the gwr is **0.8430** which is significantly better than the global multiple linear regression model of **0.6472**. However, adjusted $R^2$ is not measure we want to use to determine a good model. We want to look at the AICc value which is **42,263.61**. It is significantly smaller than the global multiple linear regression model of **42967.1**.
### Building Adaptive Bandwidth GWR Model
Similar to the earlier section, used `bw.ger()` to determine the recommended data point to use.
The code chunk below look very similar to the one used to compute the fixed bandwidth except the `'adaptive'` argument has changed to "**TRUE"**.
```{r}
bw.adaptive <- bw.gwr(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD +
PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_MRT + PROX_PARK +
PROX_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data=condo_resale.sp,
approach="CV",
kernel="gaussian",
adaptive=TRUE,
longlat=FALSE)
```
The result shows that the 30 is the recommended data points to be used.
#### Constructing the adaptive bandwidth gwr model
The code chunk below calibrates the gwr-based hedonic pricing model by using adaptive bandwidth and gaussian kernel.
```{r}
gwr.adaptive <- gwr.basic(formula = SELLING_PRICE ~ AREA_SQM +
AGE +
PROX_CBD +
PROX_CHILDCARE +
PROX_ELDERLYCARE +
PROX_URA_GROWTH_AREA +
PROX_MRT +
PROX_PARK +
PROX_PRIMARY_SCH +
PROX_SHOPPING_MALL +
PROX_BUS_STOP +
NO_Of_UNITS +
FAMILY_FRIENDLY +
FREEHOLD,
data=condo_resale.sp,
bw=bw.adaptive,
kernel = 'gaussian',
adaptive=TRUE,
longlat = FALSE)
gwr.adaptive
```
The report shows that the adjusted $R^2$ of the gwr is **0.8561** which is significantly better than the global multiple linear regression model of **0.6472** but again, we should not look at the $R^2$. Looking at the AICc of the adaptive distance gwr which is 41,982.22, we see that it is even smaller than the AICc of the fixed distance gwr of 42,263.61.
### Visualizing GWR Output
```{r}
condo_resale.sf.adaptive <- st_as_sf(gwr.adaptive$SDF) %>%
st_transform(crs=3414)
condo_resale.sf.adaptive.svy21 <- st_transform(condo_resale.sf.adaptive, 3414)
condo_resale.sf.adaptive.svy21
```
```{r}
gwr.adaptive.output <- as.data.frame(gwr.adaptive$SDF)
condo_resale.sf.adaptive <- cbind(condo_resale.res.sf, as.matrix(gwr.adaptive.output))
glimpse(condo_resale.sf.adaptive)
```
```{r}
summary(gwr.adaptive$SDF$yhat)
```
## Visualizing Local R2
The code chunks below is used to create an interactive point symbol map.
```{r}
#| fig-width: 12
tmap_mode("view")
tm_shape(mpsz_svy21)+
tm_polygons(alpha = 0.1) +
tm_shape(condo_resale.sf.adaptive) +
tm_dots(col = "Local_R2",
border.col = "gray60",
border.lwd = 1,
palette = "RdPu") +
tm_view(set.zoom.limits = c(11,14))
```
## Visualizing Coefficient Estimates
The code chunks below is used to create an interactive point symbol map.
```{r}
#| fig-width: 12
tmap_mode("view")
AREA_SQM_SE <- tm_shape(mpsz_svy21)+
tm_polygons(alpha = 0.1) +
tm_shape(condo_resale.sf.adaptive) +
tm_dots(col = "AREA_SQM_SE",
border.col = "gray60",
border.lwd = 1,
palette = "RdPu") +
tm_view(set.zoom.limits = c(11,14))
AREA_SQM_TV <- tm_shape(mpsz_svy21)+
tm_polygons(alpha = 0.1) +
tm_shape(condo_resale.sf.adaptive) +
tm_dots(col = "AREA_SQM_TV",
border.col = "gray60",
border.lwd = 1,
palette = "RdPu") +
tm_view(set.zoom.limits = c(11,14))
tmap_arrange(AREA_SQM_SE, AREA_SQM_TV,
asp=1, ncol=2,
sync = TRUE)
```
### By URA Planning Region
The code chunk below changes the boundaries or shapes to only those in the "CENTRAL REGION".
```{r}
#| fig-width: 12
tmap_mode("plot")
tm_shape(mpsz_svy21[mpsz_svy21$REGION_N=="CENTRAL REGION", ])+
tm_polygons()+
tm_shape(condo_resale.sf.adaptive) +
tm_bubbles(col = "Local_R2",
size = 0.15,
border.col = "gray60",
border.lwd = 1,
palette = "RdPu")
```